Just multiply the denominator by the righthand side and check that you get the numerator: (\sqrt3-1)(\sqrt3+2)=3+2\sqrt3-\sqrt3-2=\sqrt3+1 To get the result without knowing it ahead of time, ...

Let c be your continued fraction. Then c=2207-\frac1c that is c^2-2207c+1=0 giving c=\frac{2207+987\sqrt{5}}{2}. We find c^{1/2}=\frac{47+21\sqrt{5}}{2}, c^{1/4}=\frac{7+3\sqrt{5}}{2} ...

Hint: Elaborating on what Ahsan said, you can use \mathrm{Res}(f,c) = \frac{1}{(n-1)!} \lim_{z \to c} \frac{d^{n-1}}{dz^{n-1}}\left( (z-c)^{n}f(z) \right). \tag{1} when you have a ...

It looks as if we took a sample of 36, then did it again, and again, until we had a sample of 360. The 10 numbers 10, 12, 7, and so on represent the number of successes in the various ...

N^2 = \frac{(\sqrt5 + 2) + (\sqrt 5 - 2) + 2\sqrt{(\sqrt 5 + 2)(\sqrt 5 - 2)}}{\sqrt 5 + 1} =\\=\frac{2\sqrt 5 + 2\sqrt{5-4}}{\sqrt 5 + 1} =... Can you see where this is going?

As Ross says, the point of minimum and maximum distance from origin will lie on line joining centre of sphere with origin. The centre of sphere is \langle1,1,1\rangle and radius is 1 unit. So a ...